Special Issue on Fractional Partial Differential Equations

Submission Deadline: Oct. 30, 2019

This special issue currently is open for paper submission and guest editor application.

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Special Issue Flyer (PDF)

  • Special Issue Editor
    • Shou-Fu Tian
      School of Mathematics, Institute of Mathematical Physics, China University of Mining and Technology, Xuzhou, Jiangsu, China
    Guest Editors play a significant role in a special issue. They maintain the quality of published research and enhance the special issue’s impact. If you would like to be a Guest Editor or recommend a colleague as a Guest Editor of this special issue, please Click here to fulfill the Guest Editor application.
    • Gangwei Wang
      Hebei University Of Economics And Business, Hebei, China
    • Deng-Shan Wang
      School of Applied Science, Beijing Information Science and Technology University, Beijing, China
    • Chuanzhong Li
      Department of Mathematics, Ningbo University, Ningbo, Zhejiang, China
    • Zhongzhou Dong
      Henan Polytechnic University, Jiaozuo, China
    • Xiangpeng Xin
      Liaocheng University, Liaocheng, Shandong, China
    • Xizhong Liu
      Shaoxing University, Shaoxing, China
    • Dr. Muhammad Asghar
      Department of Mathematics, National College of Business Administration & Economics, Bahawalpur, Punjab, Pakistan
    • Department of Basic Sciences, University of Engineering and Technology, Peshawar, KPK, Pakistan
  • Introduction

    Fractional partial differential equations (FPDEs) appear in various research and engineering applications such as physics, biology, rheology, viscoelasticity, control theory, signal processing, systems identification, electrochemistry and eco-economical. Several efficient methods have been presented to solve FPDEs of interest. It is necessary to point out that some methods to nonlinear FPDEs for constructing numerical, and analytical methods to examine solutions of FPDEs.

    Aims and Scope:

    1. Fractional partial differential equations
    2. Lie symmetry analysis
    3. Riemann-Liouville derivative
    4. Symbolic computation
    5. Explicit solutions
    6. Reduced

  • Guidelines for Submission

    Manuscripts can be submitted until the expiry of the deadline. Submissions must be previously unpublished and may not be under consideration elsewhere.

    Papers should be formatted according to the guidelines for authors (see: http://www.acmath.org/submission). By submitting your manuscripts to the special issue, you are acknowledging that you accept the rules established for publication of manuscripts, including agreement to pay the Article Processing Charges for the manuscripts. Manuscripts should be submitted electronically through the online manuscript submission system at http://www.sciencepublishinggroup.com/login. All papers will be peer-reviewed. Accepted papers will be published continuously in the journal and will be listed together on the special issue website.

  • Published Papers

    The special issue currently is open for paper submission. Potential authors are humbly requested to submit an electronic copy of their complete manuscript by clicking here.

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